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Is this a sufficient condition to prove P is not equal to NP?

I suppose {1} refers to the following problem, which I will call B. Instance: A binary string b Question: Is b=1? It seems, P=NP would imply B is NP-hard via polynomial-time reductions. Indeed, assume ...
Paúl Risco's user avatar
5 votes
1 answer
391 views

Is there a problem known to have no fastest algorithm, up to polynomials?

Is there a problem where for all correct algorithms $A$, letting $T(n)$ be the runtime of $A$, there exists $\varepsilon > 0$ and a correct algorithm $A'$ running in time $T(n)\cdot n^{-\varepsilon}...
GMB's user avatar
  • 2,461
3 votes
1 answer
77 views

Halting problem with minimal Turing Machine as promised input

Consider the following Turing Machine A. Input: Turing Machine M that recognizes some language L(M) Output: If M is minimal (i.e. its length is minimum among Turing Machines that recognize the same ...
BookH's user avatar
  • 39
4 votes
1 answer
33 views

Equal appearance of positive and negative literals in 1-IN-3SAT per variable: Is it NP-complete?

The variant is the regular 1-in-3SAT problem with only the formulae where each variable and its negation appear the same number of times in the formula. For example, $(a\vee b\vee\neg a)\wedge(\neg a\...
AmirD's user avatar
  • 41
0 votes
0 answers
26 views

Two-stage Robust Shortest Path Problem - worst- case second-stage of an optimal solution

in the paper Improved Approximations for Two-stage Min-Cut and Shortest Path Problems under Uncertainty chapter 4, they are using an algorithm to approximate the two-stage robust shortest path problem....
Troy Troy's user avatar
0 votes
0 answers
46 views

Why can negating '$\Phi(G) \geq \Omega(\phi)$' be converted to '$\Phi(G) <3\phi$' in this proof instead of '$\Phi(G) < c \cdot \phi$ for all $c > 0$'?

If we want to negate the statement '$\Phi(G)$ is at least $\Omega(\phi)$', the result is usually '$\Phi(G) < c \cdot \phi$ for all $c > 0$'. However, I found that a contrapositive only indicates ...
Tyven's user avatar
  • 1
-1 votes
1 answer
92 views

Is any procedure satisified by the principle of least action able to be simulated by Turing Machine?

The Hamilton action $S$ is defined as following: $$S=\int^T_0 L(q,\dot{q})dt$$ the integral along any actual or virtual (conceivable or trial) space-time trajectory q(t) connects two specified space-...
XL _At_Here_There's user avatar
-3 votes
0 answers
24 views

NOT(𝑅𝐸∪𝑐𝑜−𝑅𝐸) reduction to NOT(𝑅𝐸∪𝑐𝑜−𝑅𝐸) always exists?

Does reduction between NOT(𝑅𝐸∪𝑐𝑜−𝑅𝐸) to NOT(𝑅𝐸∪𝑐𝑜−𝑅𝐸) always exists?
Daniel A.'s user avatar
4 votes
1 answer
130 views

A potentially novel complexity measure for sets of strings

Inspired partly by Scott Aaronson's post about the first law of complexodynamics, I've been thinking lately about how to quantify the "interesting" or "structured" complexity of a ...
CyborgOctopus's user avatar
1 vote
1 answer
64 views
+100

Can a Queue with Fewer Serves outperform a Queue with More Servers?

I am working on simulating an MMK queue with the following parameters: ...
stats_noob's user avatar
0 votes
1 answer
74 views

Finite sets in Coq

I am a beginner and trying to figure out how to work with finite sets and maps in Coq. I want to define an inductive type X with a single constructor that takes as an argument a finite set of elements ...
anonymous's user avatar
-1 votes
1 answer
60 views

Computing non-halting inputs of semantic non-equivalent programs

Let P and Q be two programs take one natural number as input and produce no output and they are not semantically equivalent, that is, there exists at least one input value n such that either P(n) ...
Antonio Valerio Miceli-Barone's user avatar
-4 votes
0 answers
31 views

How do I iterate over (w* y*)* [closed]

0 {ε} 1 {{w, y}, {wy, ww}, {www, wwy, wyy, yyy}, …} W can’t be after an Y 2 { ? } I still cant figure out how nested stars behave.
Felipe C's user avatar
2 votes
0 answers
29 views

Is PP non-adaptively random self reducible?

It is well known that $\mathsf{\#P}$ is non-adaptively random self-reducible, with the common proof given via the permanent. Feigenbaum and Fortnow showed that this implies $\mathsf{PP}$ is adaptively ...
Marshall's user avatar
0 votes
0 answers
29 views

Python : Regex to min-DFA - help with repetition {n,m} and {n, } [closed]

I wrote a program in python to process a regex string into DFA, so far i got all operations working (kleene star, union, alteration, nester parentheses, epsilon transition and single repetition {n}. ...
txblx's user avatar
  • 1
0 votes
0 answers
33 views

Is the problem of maximizing the weight loss in a spanning tree with edge restoration NP-hard?

Given $G = (V, E, w)$, an undirected weighted graph, where $V$ is the set of vertices, $E$ is the set of edges, and $w: E \rightarrow \mathbb{R}^+$ is a function assigning positive real weights to the ...
Toyllo's user avatar
  • 51
4 votes
0 answers
113 views

Implementation of László Babai's Graph Isomorphism Algorithm

Has anyone (that we know of) ever actually implemented László Babai's algorithm for graph isomorphism in quasipolynomial time? If not, would such a thing even be possible/feasible?
bigsapphicdisaster's user avatar
3 votes
1 answer
326 views

Does ETH imply P vs NP is decidable?

I have been reading Scott Aaronson's summary paper on P vs NP. In this paper, there was a section about the likelihood of the problem being undecidable (page 28). He mentions a paper that I could no ...
maikio's user avatar
  • 59
3 votes
0 answers
100 views

Is it known that $\mathsf{E} \subset \mathsf{NP} \subset \mathsf{SIZE}[n^k]$ is false?

Is it known that $\mathsf{E} \subset \mathsf{NP} \subset \mathsf{SIZE}[n^k]$ is false? It is easy to show that the relaxed version ($\mathsf{E} \subset \mathsf{NP}$ and $\mathsf{P}^{\mathsf{NP}} \...
Stefan G.'s user avatar
  • 271
1 vote
0 answers
37 views

Can a combinator basis set of size two have an arbitrary combinator?

The S and K combinators are a known basis set of combinators. Such a set is called universal. However, two combinators being universal is the limit on universality, as a single combinator cannot be ...
undefned's user avatar
-2 votes
0 answers
69 views

Can PA model a Turing machine verifying a proof in ZFC that PA is consistent?

I've made the following assumptions: In the language of ZFC, there is a proof that PA is consistent. You can construct a Turing machine which verifies proofs written in ZFC. Peano Arithmetic can ...
bitconfused's user avatar
4 votes
0 answers
144 views

Minimum Regular Expression for Strings not Containing Substring?

Given an alphabet $\Sigma$ and a fixed nonempty string $w$, consider the problem of finding a minimum regular expression $R(\Sigma, w)$ for all strings in $\Sigma^\star$ that do not contain $w$ as a ...
Ryan Dougherty's user avatar
0 votes
0 answers
34 views

Are there approaches to deriving a Grammar(production rules) from given set of strings?

Apologies for unambiguous question. So far I have a lot of difficulties of discerning on how to design formal production rules for some formal language aside from classic examples such as equal pairs ...
Leonardo's user avatar
3 votes
2 answers
166 views

Admissible rules in dependent type theory

From the nlab article on Martin-Löf dependent type theory: The weakening and substitution rules are admissible rules: they do not need to be explicitly included in the type theory as they could be ...
Michael's user avatar
  • 31
0 votes
0 answers
64 views

Incremental path (graph theory)

I have the following problem, which I don't know how to solve. Can anyone help me? Algorithm needs to be in $O(n^2 log\ n)$ Input: A matrix $C[1..n][1..n]$ with the costs of the edges $\{i,j\}$, where ...
George's user avatar
  • 1
2 votes
0 answers
78 views

Implication of having a classical oracle separation for $QMA$ and $QCMA$

There is a known quantum oracle relative to which QMA is not contained in the QCMA class. [Aaronson & kuperberg '07] It is unknown if there exists a classical (deterministic) oracle relative to ...
Manish Kumar's user avatar
-2 votes
1 answer
97 views

How to find regular expression using ardent's rule for recursive expressions? [closed]

I have the following automata: States = {A,B} Transitions = { (A,0,A), (B,0,B), (A,1,B), (B,1,A) } Initial state = A Final state = B Inputs = {0,1} Here if I try ...
A J's user avatar
  • 5
5 votes
0 answers
200 views

How to prove following weighted forest problem is NP-hard?

I am studying the following weighted forest problem, which is an optimization problem in graph theory focused on finding optimal forest structures in robust scenarios. The problem is defined as ...
Toyllo's user avatar
  • 51
1 vote
1 answer
73 views

Norm in the definition of sampling computational complexity class SampP

This paper defines the class of sampling problems SampP (see Definition 11). It requires that the probability of the generated samples $C_x$ is close to the target probability $D_x$ within an error $\...
Doriano Brogioli's user avatar
2 votes
0 answers
141 views

Is $K^t$ complexity closed under composition

Call a function $\alpha : \mathbb{N} \rightarrow \mathbb{N}$ reasonable if $\forall c \in \mathbb{N}, \exists_\infty n, c K^{2n}(n) \leq \alpha (n)$. Where $K^t$ is the time bounded Kolmogorov ...
ULechine's user avatar
  • 309
3 votes
1 answer
86 views

Escaping the cycle: Route planning in graphs with conditional logic

Given a directed graph $G(V, E)$, I want to find a route, $R \in E^*$ from $S$ to $T$ for $S,T \in V$. If $G$ includes a cycle, how can I find a route that includes $n$ iterations of the cycle before ...
Fifteen12's user avatar
5 votes
0 answers
115 views

Given a 2-player zero-sum game in EFG, find a pure Nash equilibrium (given that one exists)

Say we want to find a pure Nash equilibrium of a 2-player zero-sum (2P0S) game. A pure equilibrium does not exist for all games, so let's consider the setting where we are promised that such an ...
Kevin Wang's user avatar
2 votes
0 answers
157 views

How powerful is Quantum Turing machine with an oracle access to NP?

I would like to know the upper bound on the class of problem efficiently solved by a BQP (machine) with access to: (i) a single (oracular) call to NP machine (or, $BQP^{NP[1]}$) (ii) poly-logarithmic ...
Manish Kumar's user avatar
1 vote
0 answers
80 views

Definition of unambiguity in alternating finite automata

I would need to know if somebody in the literature studied the concept of unambiguity in the context of alternating finite automata (AFA). Of course there's a lot of work on unambiguity in NFAs, and I ...
Nicola Gigante's user avatar
0 votes
0 answers
75 views

Witness for NL Computation

For any NP language, we usually describe the language as having a polynomial time TM M such that for yes instance x you can find a witness such that M(x, w) accepts and for no instance M will not ...
kingoyster's user avatar
1 vote
0 answers
65 views

Complexity of single bit recovery version of Integer Factorization problem

Consider the integer factoring problem with exactly 2 prime factors $p.q=N$. Given $N$ find the prime factors $p$ and $q$. The problem is notoriously difficult (on classical computers) and is the ...
TheoryQuest1's user avatar
5 votes
0 answers
144 views

Is this class between BPP and PP?

In analogy to BPP, I define a class XYZ (maybe it already has a name) as follows. For every language $L$ in XYZ, there is an algorithm $M$, such that: $M$ runs in polynomial time on the size of its ...
Doriano Brogioli's user avatar
5 votes
2 answers
308 views

Orientations of an undirected graph

I would like to ask about an approach to find the min. number of edge orientations to ensure that a specific subset of nodes (between which demand exists) in a weighted undirected graph is eventually ...
L. Wallet's user avatar
6 votes
0 answers
103 views

Extensions of linear integer arithmetic decidable via Deterministic Pushdown Automata

I've recently learned about the connection between linear integer arithmetic (Presburger arithmetic) and Deterministic Finite Automata (DFAs). Namely, any formula in the first order theory of ...
Igor Khavkine's user avatar
-2 votes
0 answers
52 views

Source for the "Recursion Theorem" in the context of Turing Machines

Hi and thank you for reading me, I saw a result that interests me in this lecture by Shalev Ben-David, called the "recursion theorem" (Theorem 19.1). It roughly states that : Fix an input ...
user8622655's user avatar
0 votes
0 answers
72 views

Regatta Scheduling Problem

I think I have a Hamilton path finding problem, with a twist. No one asked me to solve this, but I'm trying to do it anyway. I'm rowing in a regatta tomorrow. There are about forty-two crews in the ...
user73368's user avatar
1 vote
0 answers
32 views

PAC-learning description of (quantum) hypothesis class containing randomness

I was wondering how to correctly describe the following hypothesis class mathematically correctly: Say I have a quantum circuit which I postprocess by feeding its results into a neural network. How ...
Taleofwoe's user avatar
2 votes
0 answers
81 views

When is an upper bound on the longest irreducible program outputting something computable?

This is a repost of this mathoverflow question. Given some way to to encode programs to strings with a finite alphabet, which we assume has a computable translation to/from Turing machines, a program ...
Command Master's user avatar
1 vote
1 answer
127 views

Graph canonization vs. NP

Is graph canonization (GC) in NP? Is it NP-hard? If unknown, what would be your best guess and why? GC is GI-hard (GI-completeness is unknown), with the graph isomorphism problem being in NP and a ...
Julius Kunze's user avatar
1 vote
0 answers
49 views

Streaming when doing computations with abstract term rewriting systems?

Computation models such as interaction nets can represent any computation as they are Turing complete. However, I have been investigating their practical implementations, and I'm wondering if there's ...
Synchronous's user avatar
7 votes
0 answers
140 views

Bounds on the length of simple paths in DFAs resulting from the powerset construction of an NFA

In general, a DFA $P(A)$ resulting from the powerset construction of an $m$-states NFA $A$ may have $2^m$ states, and a simple path traversing all these states is often there. However, I cannot find ...
Nicola Gigante's user avatar
2 votes
0 answers
137 views

Counterexample for the 1-optimal matching algorithm in Gabow's and Tarjan's paper on scaling algorithms for networks

Context I am reading Faster scaling algorithms for network problems by Gabow and Tarjan where I am researching part 2: "Matching and extensions". However, I am a bit confused with the ...
genzee's user avatar
  • 21
4 votes
0 answers
146 views

Any advice for a third-year undergraduate student who wanna embark on tcs research in the future?

I'm about to be a third-year undergraduate student next month. There're not too many opportunities to do theory research(there are some but I think I'm not interested) especially for those without ...
Hunter19019's user avatar
2 votes
0 answers
73 views

Learning a boolean function using decision tree with small number of queries

I am working on a problem and I am looking to solve the following subproblem : Given a "restrictive" blackbox access to boolean function $\phi$, output a "small-sized" CNF that ...
AlternatingGroupoid's user avatar
2 votes
1 answer
70 views

Complexity of a variation of edge cover for paths

Consider the following problem. Given a directed acyclic graph $G=(V,E)$ with a designated source vertex $s\in V$ and sink vertex $t\in V$, and natural number $k$. Find a smallest set $E'\subseteq E$ ...
Marc Geilen's user avatar

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